Get out or commit. Would take gonads to make either happen.
Watch him try to do both. I can see him coming out and saying after much deliberation, blah blah blah...he’s decided Gen. McChrystal is right, and he’s sending more troops in. But - after all his blah blah blah - he’s determined that 40,000 isn’t the right number, we can achieve desired results with (pick a number)...say, 4,000 troops.
They don’t call him Liar in Chief for nothing.
Interesting how the Binomial Distribution applies in this case.
However, the problem is estimating the associated probabilities...a difficult task.